A Linking/S1 Equivariant Variational Argument in the space of Dual Legendrian curves and the proof of the Weinstein Conjecture on S3 "in the large"

Abstract

Let α be a contact form on S3, let be its Reeb vector-field and let v be a non-singular vector-field in kerα. Let Cβ be the space of curves x on S3 such x=a+bv, a=0, a 0. Let L+, respectively L-, be the set of curves in Cβ such that b≥ 0, respectively b ≤ 0. Let, for x ∈ Cβ, J(x)=∫01αx( x)dt. We establish in this paper that an infinite number of cycles in the S1-equivariant homology of Cβ, relative to L+ L- and to some specially designed "bottom set", see section 4, are achieved in the Morse complex of (J, Cβ) by unions of unstable manifolds of critical points (at infinity)which must include periodic orbits of ; ie unions of unstable manifolds of critical points at infinity alone cannot achieve these cycles. The topological argument of existence of a periodic orbit for turns out to be surprisingly close, in spirit, to the linking/equivariant argument of P.H. Rabinowitz in [12]. The objects and the frameworks are strikingly different, but the original proof of [12] can be recognized in our proof, which uses degree theory, the Fadell-Rabinowitz index [8] and the fact that πn+1(Sn)=Z2, n≥ 3. The arguments hold under the basic assumption that no periodic orbit of index 1 connects L+ and L-. To a certain extent, the present result runs, especially in the case of three-dimensional overtwisted [8] contact forms, against the existence of non-trivial algebraic invariants defined by the periodic orbits of and independent of what ker α and/or α are.